Existence of solutions to a generalized self-dual Chern-Simons equation on graphs

Abstract

Let G=(V,E) be a connected finite graph and the usual graph Laplacian. In this paper, we consider a generalized self-dual Chern-Simons equation on the graph G eqnarrayone1 u=-λeF(u)[eF(u)-1]2+4πΣi=1Mδpj, eqnarray where equation F(u)=\arrayl F(u), \ u≤0, 0, u>0, array . equation F(u) satisfies u=1+ F(u)-e F(u) , λ>0 , M is any fixed positive integer, δpj is the Dirac delta mass at the vertex pj, and p1, p2, ·s, pM are arbitrarily chosen distinct vertices on the graph. We first prove that there is a critical value λc such that if λ ≥λc, then the generalized self-dual Chern-Simons equation has a solution uλ. Applying the existence result, we develop a new method to construct a solution of the equation which is monotonic with respect to λ when λ ≥λc. Then we establish that there exist at least two solutions of the equation via the variational method for λ>λc. Furthermore, we give a fine estimate of the monotone solution which can be applied to other related problems.